%N Number of self-avoiding walks of length n on square lattice such that at each point the angle turns 90 degrees (the first turn is assumed to be to the left - otherwise the number must be doubled).

%C The number of snakes composed of n identical segments such that the snake starts with a left turn and the other (n-2) joints are bent at 90-degree angles, either to the left or to the right, in such a way that the snake does not overlap.

%e Representing the walk (or snake) as a sequence of turns I and -I in the complex plane, with the initial condition that the first turn is I, for length 2 we have [I], for length 3 we have [I,I], [I,-I], and for length 4 we have [I,I,-I], [I,-I,I], [I,-I,-I].